In Mathematica 8.0.1.0 on 32-bit Linux, the expression

```
InverseFunction[0 &]@0
```

returns `33/10`

. (The same occurs for other integer and rational values; I'm using `0`

as an example.)

According to the documentation for `InverseFunction`

:

As discussed in Functions That Do Not Have Unique Values, many mathematical functions do not have unique inverses. In such cases, InverseFunction[f] can represent only one of the possible inverses for f.

As a constant function `0&`

will return `0`

regardless of its input, it has infinitely many inverse functions (each of which is defined only at 0). So as defined, this answer is within the specification.

The mystery is, **why does it give 33/10 rather than any other value**?

`Trace[InverseFunction[6 &]@6, TraceInternal -> True]`

And search for 33/10 near the end – belisarius Oct 12 '11 at 6:01`SeedRandom[0]`

,`RandomSample[Range[-50,50],1]`

produces`{33}`

so I'm guessing that's where it comes from. – Heike Oct 12 '11 at 8:16`TraceInternal->True`

, you see, among the huge output, code like`System`InstanceDump`freepts[{System`TRootsDump`X$2453}, System`InstanceDump`dds$2454, 1]`

. If you further trace the`Trace[System`InstanceDump`freepts[{x}, {{x -> Reals}}, 1]]`

, you see`System`InstanceDump`RandomSampleI[ Range[-(System`InstanceDump`$intsize/2), System`InstanceDump`$intsize/ 2], 1]/Sqrt[System`InstanceDump`$intsize]`

. The`intsize`

variable is actually set to`100`

, which, combined with observations of belisarius and Heike, leads to the puzzling output. – Leonid Shifrin Oct 12 '11 at 10:32`SeedRandom[0]; RandomChoice[Range[n]]`

gives`42`

for any`n`

in the range`[42, 64]`

. Coincidence? I think not. – Heike Oct 13 '11 at 17:56